y = (0)^3 − 12(0) = 0The curve has a y-intercept at (0, 0).
There are no asymptotes, because there’s no place where the curve is undefined (you won’t have
asymptotes for curves that are polynomials).
Step 2: Take the derivative of the function to find the critical points.
= 3x^2 − 12Set the derivative equal to zero, and solve for x.
3 x^2 − 12 = 03(x^2 − 4) = 03(x − 2)(x + 2) = 0so x = 2, −2.
Next, plug x = 2, −2 into the original equation to find the y-coordinates of the critical points.
y = (2)^3 − 12(2) = −16y = (−2)^3 − 12(−2) = 16Thus, we have critical points at (2, −16) and (−2, 16).
Step 3: Now, take the second derivative to find any points of inflection.
= 6xThis equals zero at x = 0. We already know that when x = 0, y = 0, so the curve has a point of inflection at
(0, 0).
Now, plug the critical values into the second derivative to determine whether each is a maximum or a
minimum. f′′(2) = 6(2) = 12. This is positive, so the curve has a minimum at (2, −16), and the curve is
concave up at that point. f′′(−2) = 6(−2) = −12. This value is negative, so the curve has a maximum at (−2,
16) and the curve is concave down there.
Armed with this information, we can now plot the graph.